A metric sphere not a quasisphere but for which every weak tangent is Euclidean
Abstract
We show that for all n ≥ 2, there exists a doubling linearly locally contractible metric space X that is topologically a n-sphere such that every weak tangent is isometric to n but X is not quasisymmetrically equivalent to the standard n-sphere. The same example shows that 2-Ahlfors regularity in Theorem 1.1 of BK02 on quasisymmetric uniformization of metric 2-spheres is optimal.
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